A System of Geometry and Trigonometry: Together with a Treatise on Surveying : Teaching Various Ways of Taking the Survey of a Field : Also to Protract the Same and Find the Area : Likewise, Rectangular Surveying, Or, an Accurate Method of Calculating the Area of Any Field Arithmetically Without the Necessity of Plotting it : to the Whole are Added Several Mathematical Tables Necessary for Solving Questions in Trigonometry and Surveying with a Particular Explanation of Those Tables and the Manner of Using Them :compiled from Various Authors |
From inside the book
Results 1-5 of 19
Page 22
... preceding PROPOSITIONS and RULES being duly attended to , the solution of the following CASES of Rec- tangular Trigonometry will be easy . CASE I. The Angles and Hypothenuse given to find the Legs . Fig . 39 . In the Triangle ABC ...
... preceding PROPOSITIONS and RULES being duly attended to , the solution of the following CASES of Rec- tangular Trigonometry will be easy . CASE I. The Angles and Hypothenuse given to find the Legs . Fig . 39 . In the Triangle ABC ...
Page 24
... preceding figure may be called one more than it is , viz . 2. And whenever in any Product , & c . there are more places of Decimals than you wish to work with , if the one at the Right Hand of the last which you wish to retain is more ...
... preceding figure may be called one more than it is , viz . 2. And whenever in any Product , & c . there are more places of Decimals than you wish to work with , if the one at the Right Hand of the last which you wish to retain is more ...
Page 26
... preceding CASES . It is 30 . By Natural Sines . The Angle opposite the given Leg may be found by the following Proportion : As the Hypothenuse ; Is to Unity or 1 ; So is the given leg ; To the Nat . Sine of its opposite Angle . Or ...
... preceding CASES . It is 30 . By Natural Sines . The Angle opposite the given Leg may be found by the following Proportion : As the Hypothenuse ; Is to Unity or 1 ; So is the given leg ; To the Nat . Sine of its opposite Angle . Or ...
Page 27
... preceding EXAMPLE ; The Square of the Leg AB 40 is 1600 ; this subtracted from the Square of the Hypothenuse 50 which is 2500 , leaves 900 , the Square of the Leg BC , the Square Root of which is 30 , the length of Leg BC as found by ...
... preceding EXAMPLE ; The Square of the Leg AB 40 is 1600 ; this subtracted from the Square of the Hypothenuse 50 which is 2500 , leaves 900 , the Square of the Leg BC , the Square Root of which is 30 , the length of Leg BC as found by ...
Page 28
... of which is nearest 119 . By Natural Sines . The Hypothenuse being found by the Square Root , the Angles may be found by Nat . Sines , according to the Nat . Sine Hyp . Leg . BC . 119 preceding CASE . 28 TRIGONOMETRY .
... of which is nearest 119 . By Natural Sines . The Hypothenuse being found by the Square Root , the Angles may be found by Nat . Sines , according to the Nat . Sine Hyp . Leg . BC . 119 preceding CASE . 28 TRIGONOMETRY .
Common terms and phrases
70 Dist Acres Rood Rods Angle opposite Answ Bearing and Distance C.Sine Sine C.Tang C.Tang Secant Circle Co-Sine Compass Decimal Degrees and Minutes Diagonal Diameter Doub Double Area double the Area draw a Line Draw the Line FIELD BOOK find the Angles find the Area find the Leg given Leg given number given Side Latitude and Departure Leg AB Leg BC length Logarithmic Sine Mathematical Tables measure multiply N.CS Natural Sines North Areas Note number of Acres number of Degrees opposite Angle Parallelogram Perpendicular PLATE PROBLEM protract Quotient Radius Remainder Rhombus Right Angled Triangle RULE Secant C.Sec second Departure Column Side BC Sine C.Sine Tang Sine C.Tang Tang Sine Sine Sine Sine Tang South Areas Square Chains Square Root stationary Lines subtract survey a Field Surveyor Table of Logarithmic Tangent or Secant Trapezium Trapezoid Triangle ABC TRIGONOMETRY whole Number
Popular passages
Page 10 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees ; and each degree into 60 equal parts, called minutes ; and each minute into 60 equal parts, called seconds ; and these into thirds, &c.
Page 32 - As the base or sum of the segments Is to the sum of the other two sides, So is the difference of those sides To the difference of the segments of the base.
Page ii - District, has deposited in this office the title of a book, the right whereof he claims as proprietor, in the words following, to wit : " THE CHILD'S BOTANY," In conformity to the act of the Congress of the United States, entitled, " An act for the encouragement of learning by securing the copies of maps, charts, and books to the authors and proprietors of such copies, during the times therein mentioned...
Page 14 - Figures which consist of more than four sides' are called polygons; if the sides are equal to each other they are called regular polygons, and are sometimes named from the number of their sides, as pentagon, or hexagon, a figure of five or six sides, &c.; if the sides are unequal, they are called irregular polygons.
Page ii - RILEY, of the said district, hath deposited in this office the title of a book, the right whereof he claims as proprietor, in the words and figures following, to wit : " Collections of the New-York Historical Society. For the year 1809. Volume I. Esti nen prosunt singula, juncta juvent...
Page ii - ... encouragement of learning by securing the copies of maps, charts, and books, to the authors and proprietors of such copies, during the times therein mentioned ; " and extending the benefits thereof to the arts of designing, engraving, and etching historical, and other prints.
Page 11 - Fig. 7. 23. The Tangent of an Arch is a Right Line touching the Circumference, and drawn perpendicular to the Diameter ; and 'is terminated by a Line drawn from the Centre through the other end of the Arch ; thus BK is the Tangent of the Arch BH.
Page 10 - The radius of a circle is a line drawn from the centre to the circumference, as A, B.
Page 10 - The chord of an arc of 60 degrees is equal in length to the radius of the circle of which the arc is a part.
Page 27 - The square of the hypothenuse is equal to the sum of the squares of the other two sides ; as, 5033 402+302.